associated Laguerre polynomial

Thing special_function Q109497177

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associated Laguerre polynomial

Summary

associated Laguerre polynomial is a special function^[1].

Key Facts

associated Laguerre polynomial's instance of is recorded as special function^[2].
associated Laguerre polynomial's instance of is recorded as mathematical concept^[3].
Edmond Laguerre is named after associated Laguerre polynomial^[4].
associated Laguerre polynomial's subclass of is recorded as polynomial^[5].
associated Laguerre polynomial's described by source is recorded as ISO 80000-2:2019 Quantities and units — Part 2: Mathematics^[6].
associated Laguerre polynomial's different from is recorded as Laguerre polynomial^[7].
associated Laguerre polynomial's defining formula is recorded as \mathrm{L}n^m(z) = (-1)^m \frac{\mathrm{d}^m}{\mathrm{d}z^m} \mathrm{L}{n + m}(z), m, n \in \boldsymbol{\mathsf{N}}, m \leq n^[8].
associated Laguerre polynomial's MathWorld ID is recorded as AssociatedLaguerrePolynomial^[9].
associated Laguerre polynomial's maintained by WikiProject is recorded as WikiProject Mathematics^[10].
associated Laguerre polynomial's in defining formula is recorded as \mathrm{L}_n^m(z)^[11].
associated Laguerre polynomial's in defining formula is recorded as \mathrm{L}_n(z)^[12].
associated Laguerre polynomial's in defining formula is recorded as \boldsymbol{\mathsf{N}}^[13].

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Quick Facts

Instance of special function, mathematical concept

Subclass of polynomial

Properties

Defining formula \mathrm{L}_n^m(z) = (-1)^m \frac{\mathrm{d}^m}{\mathrm{d}z^m} \mathrm{L}_{n + m}(z), m, n \in \boldsymbol{\mathsf{N}}, m \leq n

Described by source ISO 80000-2:2019 Quantities and units — Part 2: Mathematics

Different from Laguerre polynomial

Imported from wholeness_audit_2026-05-02

In defining formula \mathrm{L}_n^m(z), \mathrm{L}_n(z), \boldsymbol{\mathsf{N}}

Maintained by wikiproject WikiProject Mathematics

Named after Edmond Laguerre

External References (1)

Mathworld id AssociatedLaguerrePolynomial

References

Programmatic citations — every numbered marker resolves to a verifiable graph row below.

Direct Wikidata claims

Class ancestry

[1] ↑ associated Laguerre polynomial is an instance of special function (Q867707) [P31, primary]. Wikidata. wikidata.org.

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APA

4ort.xyz Knowledge Graph. (2026). associated Laguerre polynomial. Retrieved May 3, 2026, from https://4ort.xyz/entity/associated-laguerre-polynomial

MLA

“associated Laguerre polynomial.” 4ort.xyz Knowledge Graph, 4ort.xyz, 3 May. 2026, https://4ort.xyz/entity/associated-laguerre-polynomial.

BibTeX

@misc{4ortxyz_associated-laguerre-polynomial_2026, author = {{4ort.xyz Knowledge Graph}}, title = {{associated Laguerre polynomial}}, year = {2026}, url = {https://4ort.xyz/entity/associated-laguerre-polynomial}, note = {Accessed: 2026-05-03}}

LLM prompt

According to 4ort.xyz Knowledge Graph (aggregator of Wikidata, Wikipedia, and authoritative open-data sources): associated Laguerre polynomial — https://4ort.xyz/entity/associated-laguerre-polynomial (retrieved 2026-05-03)

Canonical URL: https://4ort.xyz/entity/associated-laguerre-polynomial · Last refreshed: May 3, 2026